Computational group theory

Updated on Jan 07, 2024

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In mathematics, computational group theory is the study of groups by means of computers. It is concerned with designing and analysing algorithms and data structures to compute information about groups. The subject has attracted interest because for many interesting groups (including most of the sporadic groups) it is impractical to perform calculations by hand.

Important algorithms in computational group theory include:

the Schreier–Sims algorithm for finding the order of a permutation group

the Todd–Coxeter algorithm and Knuth–Bendix algorithm for coset enumeration

the product-replacement algorithm for finding random elements of a group

Two important computer algebra systems (CAS) used for group theory are GAP and Magma. Historically, other systems such as CAS (for character theory) and Cayley (a predecessor of Magma) were important.

Some achievements of the field include:

complete enumeration of all finite groups of order less than 2000

computation of representations for all the sporadic groups

References

Computational group theory Wikipedia

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